On a New Class of Weak Solutions to the Spatially Homogeneous Boltzmann and Landau Equations

We construct a class of weak solutions to the Navier᎐Stokes equations, which have second order spatial derivatives and one order time derivatives, of p power s Ž 2, r Ž .. summability for 1p F 5r4. Meanwhile, we show that u g L 0, T ; W ⍀ with 1rs q 3r2 r s 2 for 1r F 5r4. r can be relaxed not to ex

## Abstract We consider a suitable weak solution to the three‐dimensional Navier‐Stokes equations in the space‐time cylinder Ω × ]0, __T__[. Let Σ be the set of singular points for this solution and Σ (__t__) ≡ {(__x, t__) ∈ Σ}. For a given open subset ω ⊆ Ω and for a given moment of time __t__ ∈]0

We investigate the asymptotic behavior of solutions to the following system of second order nonhomogeneous difference equation: where A is a maximal monotone operator in a real Hilbert space H, {c n } and {θ n } are positive real sequences and {f n } is a sequence in H. We show the weak and strong